Renewal in Hawkes processes with self-excitation and inhibition

Costa, Manon; Graham, C. D.; Marsalle, Laurence; Tran, Viet Chi

doi:10.1017/apr.2020.19

Cited by 42 publications

(75 citation statements)

References 30 publications

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“…In this inhibition context, the cluster representation [14] on which is based the construction of a self-exciting Hawkes process, is no longer valid. While the existence and the construction of such nonlinear processes can be found in recent works for the univariate [15] and multivariate [16] cases, statistical estimation of the kernel function has been hardly addressed. A first approach consists in computing an approximation of the likelihood as if the intensity function could take negative values, and optimizing it to get a maximum likelihood estimator [17].…”

Section: Introductionmentioning

confidence: 99%

Maximum likelihood estimation for Hawkes processes with self-excitation or inhibition

Bonnet¹,

Herrera²,

Sangnier³

2021

Statistics & Probability Letters

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In this paper, we present a maximum likelihood method for estimating the parameters of a univariate Hawkes process with self-excitation or inhibition. Our work generalizes techniques and results that were restricted to the self-exciting scenario. The proposed estimator is implemented for the classical exponential kernel and we show that, in the inhibition context, our procedure provides more accurate estimations than current alternative approaches.

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Section: Introductionmentioning

confidence: 99%

Maximum likelihood estimation for Hawkes processes with self-excitation or inhibition

Bonnet¹,

Herrera²,

Sangnier³

2021

Statistics & Probability Letters

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“…Classical stability results for multivariate nonlinear Hawkes processes found e.g. in [1] or in the recent paper [3], which is devoted to the study of the stabilising effect of inhibitions, are stated in terms of an associated weight function matrix Λ, imposing that the spectral radius of Λ is strictly smaller than one. In this case the process is termed to be subcritical .…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

“…To the best of our knowledge, only few results have been obtained on this natural question in the literature. [1] gives an attempt in this direction but does only deal with the case when c +− and c −+ are of the same sign (see Theorem 6 in [1]), and [3] do only work with the positive part of the weight functions, without profiting from the explicit inhibitory part within the system.…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

Stability for Hawkes processes with inhibition

Raad¹,

Löcherbach²

2020

Electron. Commun. Probab.

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We consider a multivariate non-linear Hawkes process in a multi-class setup where particles are organised within two populations of possibly different sizes, such that one of the populations acts excitatory on the system while the other population acts inhibitory on the system. The goal of this note is to present a class of Hawkes Processes with stable dynamics without assumptions on the spectral radius of the associated weight function matrix. This illustrates how inhibition in a Hawkes system significantly affects the stability properties of the system.

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“…Assumption 2 requires that the intensity rate is strictly bounded, which prevents degenerate processes for all components of the multivariate Hawkes processes. This assumption has been considered in the previous analysis of Hawkes processes [33][34][35]42,48]. Assumption 3.…”

Section: Theoretical Propertiesmentioning

confidence: 99%

Causal Discovery in High-Dimensional Point Process Networks with Hidden Nodes

Wang

Shojaie

2021

Entropy

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Thanks to technological advances leading to near-continuous time observations, emerging multivariate point process data offer new opportunities for causal discovery. However, a key obstacle in achieving this goal is that many relevant processes may not be observed in practice. Naïve estimation approaches that ignore these hidden variables can generate misleading results because of the unadjusted confounding. To plug this gap, we propose a deconfounding procedure to estimate high-dimensional point process networks with only a subset of the nodes being observed. Our method allows flexible connections between the observed and unobserved processes. It also allows the number of unobserved processes to be unknown and potentially larger than the number of observed nodes. Theoretical analyses and numerical studies highlight the advantages of the proposed method in identifying causal interactions among the observed processes.

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Renewal in Hawkes processes with self-excitation and inhibition

Cited by 42 publications

References 30 publications

Maximum likelihood estimation for Hawkes processes with self-excitation or inhibition

Maximum likelihood estimation for Hawkes processes with self-excitation or inhibition

Stability for Hawkes processes with inhibition

Causal Discovery in High-Dimensional Point Process Networks with Hidden Nodes

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